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楼主 |
发表于 22-2-2009 01:47 PM
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原帖由 Ivanlsy 于 22-2-2009 01:38 PM 发表 
(p√2 + q√3)^2 = (p√2 + q√3)(p√2 + q√3)
= 2p^2 + pq√6 + pq√6 + 3q^2
= 2p^2 + 2pq√6 + 3q^2
明白了
还有#16.谢谢 |
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发表于 22-2-2009 01:49 PM
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原帖由 白羊座aries 于 22-2-2009 01:03 PM 发表 
prove
1)A' ∩( A U B' ) ∩ C'=A' ∩ B' ∩ C'
A' ∩ ( A U B' ) ∩ C' = A' ∩ ( A U B' ) ∩ C'
= (A' ∩ A) U (A' ∩ B') ∩ C' (Distributive law)
= φ U (A' ∩ B') ∩ C'
= A' ∩ B' ∩ C' (Associative law) |
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发表于 22-2-2009 02:00 PM
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原帖由 白羊座aries 于 22-2-2009 01:03 PM 发表
prove
2) ( A-B ) U ( B-A )= ( A U B ) - ( A n B)
(A - B) U (B - A) = (A ∩ B') U (B ∩ A')
= [ (A ∩ B') U B ] ∩ [ (A ∩ B') U A' ]
= [ (A U B) ∩ (B' U B) ] ∩ [ (A U A') ∩ (B' U A') ]
= [ (A U B) ∩ ξ ] ∩ [ ξ ∩ (B ∩ A)' ] (De Morgan's law)
= (A U B) ∩ (A ∩ B)' (Commutative law)
= (A U B) - (A ∩ B) |
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楼主 |
发表于 22-2-2009 02:06 PM
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这题:
file:///C:/DOCUME%7E1/Tham/LOCALS%7E1/Temp/moz-screenshot.jpgfile:///C:/DOCUME%7E1/Tham/LOCALS%7E1/Temp/moz-screenshot-1.jpgfile:///C:/DOCUME%7E1/Tham/LOCALS%7E1/Temp/moz-screenshot-2.jpgfile:///C:/DOCUME%7E1/Tham/LOCALS%7E1/Temp/moz-screenshot-3.jpgfile:///C:/DOCUME%7E1/Tham/LOCALS%7E1/Temp/moz-screenshot-4.jpgDetermine the value of a if (√2 +ai)/(1+√2 i)is a real number and find this real number |
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发表于 22-2-2009 02:17 PM
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原帖由 白羊座aries 于 22-2-2009 01:03 PM 发表
solve
3) (x+iy)^2 = i,find all the values of x and y.
(x + iy)^2 = i
x^2 + 2xyi - y^2 = i
x^2 - y^2 + 2xyi = i
Compare LHS and RHS of the equation,
x^2 - y^2 = 0
2xy = 1
xy = 1/2
y =1/(2x)
x^2 - [1/(2x)]^2 = 0
x^2 - 1/(4x^2) = 0
4x^4 - 1 = 0
x^4 = 1/4
x = ±(1/√2)
y = ±(1/√2)
By completing the square or otherwise ,solve
x^2 + 4x = -9 +12i
x^2 + 4x = -9 +12i
x^2 + 4x + 2^2 = -9 +12i + 2^2
(x + 2)^2 = -5 + 12i
(x + 2)^2 = 4 + 2(±2)(±3)i - 9
= (±2)^2 + 2(±2)(±3)i + (±3i)^2
= (±2 ± 3i)^2
= [±(2 + 3i)]^2
x + 2 = 2 + 3i or x + 2 = - (2 + 3i)
x = 3i or x = -4 - 3i
[ 本帖最后由 Ivanlsy 于 22-2-2009 02:32 PM 编辑 ] |
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楼主 |
发表于 22-2-2009 02:19 PM
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原帖由 Ivanlsy 于 22-2-2009 02:17 PM 发表
(x + iy)^2 = i
x^2 + 2xyi - y^2 = i
x^2 - y^2 + 2xyi = i
Compare LHS and RHS of the equation,
x^2 - y^2 = 0
2xy = 1
xy = 1/2
y =1/(2x)
x^2 - [1/(2x)]^2 = 0
x^2 - 1/(4x^2) = 0
4x^4 - ...
原来是这么简单而已 |
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楼主 |
发表于 22-2-2009 02:24 PM
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我问的几题竟然出在历年STPM考试
全部我不会做的竟然出在STPM
我 |
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发表于 22-2-2009 02:40 PM
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原帖由 白羊座aries 于 22-2-2009 02:06 PM 发表
这题:
Determine the value of a if (√2 +ai)/(1+√2 i)is a real number and find this real number
(√2 + ai)/(1+√2i) = (√2 + ai)/(1+√2i) X (1 - √2i) / (1 -√2i)
= (√2 + ai)(1 - √2i) / (1+ 2)
= (√2 - 2i + ai + a√2)/3
= (√2 + a√2)/3 + (a -2)i/3
Since (√2 + ai)/(1+√2i) is a real number, therefore
(a - 2)/3 = 0
Hence, a = 2
(√2 + ai)/(1+√2i) = (√2 + a√2)/3 + (a -2)i/3
(√2 + 2i)/(1+√2i) = (√2 + 2√2)/3 + (2 -2)i/3
= (3√2)/3
= √2
The real number is √2.
[ 本帖最后由 Ivanlsy 于 22-2-2009 04:24 PM 编辑 ] |
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发表于 22-2-2009 03:35 PM
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楼主 |
发表于 22-2-2009 03:44 PM
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原帖由 Ivanlsy 于 22-2-2009 02:40 PM 发表
(√2 + ai)/(1+√2i) = (√2 + ai)/(1+√2i) X (1 - √2i) / (1 -√2i)
= (√2 + ai)(1 - √2i) / (1+ 2)
= (√2 - 2i + ai + a√2)/3
...
为什么
therefore那里是
a-2=0
不明白那里有a-2=0
而且也不知道怎样=0 |
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发表于 22-2-2009 04:01 PM
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原帖由 白羊座aries 于 22-2-2009 03:44 PM 发表
为什么
therefore那里是
a-2=0
不明白那里有a-2=0
而且也不知道怎样=0
z = a + bi
z is a real number if and only if b = 0.
當b等於零,虛數的部分(imagary part)就不存在了。 |
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楼主 |
发表于 22-2-2009 04:06 PM
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楼主 |
发表于 22-2-2009 04:10 PM
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(x + 2)^2 = 4 + 2(±2)(±3)i - 9
= (±2)^2 + 2(±2)(±3)i + (±3i)^2
= (±2 ± 3i)^2
= [±(2 + 3i)]^2
不明白,而且我学的completing the square method到这个地步是直接 x power of 1/2 to get rid square ..然后就可以有答案,但是我不明白你在写什么 |
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发表于 22-2-2009 04:22 PM
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原帖由 白羊座aries 于 22-2-2009 04:10 PM 发表
不明白,而且我学的completing the square method到这个地步是直接 x power of 1/2 to get rid square ..然后就可以有答案,但是我不明白你在写什么
那是一種技巧。由直接觀察的方式,直接找出expand之前的expression。
如果令
x + 2 = ±√(-5 + 12i),
則需要設
√(-5 + 12i) = a + bi
之後再求a及b的值。
這傳統方法的步驟挺長的,不過比較簡單
而我用的方法需要多一些觀察,比較浪費時間。 |
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楼主 |
发表于 22-2-2009 04:31 PM
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原帖由 Ivanlsy 于 22-2-2009 04:22 PM 发表 
那是一種技巧。由直接觀察的方式,直接找出expand之前的expression。
如果令
x + 2 = ±√(-5 + 12i),
則需要設
√(-5 + 12i) = a + bi
之後再求a及b的值。
這傳統方法的步驟挺長的,不過比較簡單
而 ...
不明白,也不会做.
我做:
x^2 +4x = -9 + 12i
x^2 +4x + (4/2)^2 = -9 +12i +(4/2)^2
(x+2)^2= -5+12i
过后呢?要怎样?这是我学的completing the square method |
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发表于 22-2-2009 04:51 PM
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原帖由 白羊座aries 于 22-2-2009 04:31 PM 发表
不明白,也不会做.
我做:
x^2 +4x = -9 + 12i
x^2 +4x + (4/2)^2 = -9 +12i +(4/2)^2
(x+2)^2= -5+12i
过后呢?要怎样?这是我学的completing the square method
(x + 2)^2 = -5 + 12i
x + 2 = ±√(-5 + 12i)
let ±√(-5 + 12i) = a + bi
-5 + 12i = (a + bi)^2
= a^2 + 2abi - b^2
= a^2 - b^2 + 2abi
Compare LHS and RHS of the equation,
a^2 - b^2 = -5
2ab = 12
ab = 6
b = 6/a
Substitute b = 6/a into a^2 - b^2 = -5,
a^2 - (6/a)^2 = -5
a^4 - 36 = -5a^2
a^4 + 5a^2 - 36 = 0
(a^2 + 9)(a^2 - 4) = 0
a^2 = -9 (Undefined) or a^2 = 4
a = ±2
b = ±3
Hence±√(-5 + 12i) = ±2 ± 3i
=±(2 + 3i)
When x + 2 = 2 + 3i,
x = 3i
When x + 2 = -(2 + 3i)
x = -4 - 3i |
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楼主 |
发表于 22-2-2009 04:55 PM
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发表于 22-2-2009 04:59 PM
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回复 37# 白羊座aries 的帖子
去那邊的芽龍尋歡作樂嗎? |
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楼主 |
发表于 22-2-2009 05:19 PM
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原帖由 Ivanlsy 于 22-2-2009 04:59 PM 发表 
去那邊的芽龍尋歡作樂嗎?
不明白,总之,就是没有遗憾了,虽然不能说100%master,但是至少我以20题练习的经验可以试下做chapter 1的练习题 |
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发表于 22-2-2009 05:40 PM
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